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Simplifying Complex Fractions
Fractions
Complex Fractions
Fractions, Ratios, Money, Decimals and Percent
Fraction Arithmetic
Fractions Worksheet
Teaching Outline for Fractions
Fractions Section 5
Fractions In Action
Complex Fractions
Fabulous Fractions
Reducing Fractions and Improper Fractions
Fraction Competency Packet
Fractions
LESSON: FRACTIONS
ADDING FRACTIONS
Complex Fractions
Fractions, Ratios, Money, Decimals and Percent
Converting Fractions to Decimals and the Order of Operations
Adding and Subtracting Fractions
Complex Fractions
Equivalent Fractions
Review of Fractions
Adding Fractions
Fractions
Equivalent Fractions
Questions About Fractions
Adding Fractions & Mixed Numbers
Adding fractions using the Least Common Denominator
Introduction to fractions
EQUIVALENT FRACTIONS
MULTIPLY TWO OR MORE FRACTIONS
Simplifying Fractions
Multiplying and Dividing Fractions
ADDITION OF FRACTIONS
Multiplying Fractions
Multiplying and Dividing Fractions
Introduction to Fractions
Simplifying Fractions by Multiplying by the LCD

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Fractions

Learn the definition of factor.
Write fractions in lowest terms.
Multiply and divide fractions.
Add and subtract fractions.
Solve applied problems that involve
fractions.
Interpret data in a circle graph.

Definitions

Natural numbers:1, 2, 3, 4,…,

Whole numbers: 0, 1, 2, 3, 4,…,

Fractions:

Proper fraction: has a value of less then 1; the numerator
is smaller than or equal to the denominator.

Improper fraction: has a value of greater then 1; the
numerator is larger than the denominator.

Mixed number: is a combination of a whole number and a
fraction.

Ex. The improper fraction can be written , a mixed number.

Objective

Learn the definition of factor.

In the statement 2 ×9 = 18, the numbers 2 and 9 are called
factors. Other factors of 18 include 1, 3, 6, and 18. The number
18 in this statement is called a product.

The number 18 is factored by writing it as a product of two or
more numbers.

Ex. 6 ·3, 18 ×1, (2)(9), or 2(3)(3)

A natural number greater than 1 is prime if its products
include only 1 and itself.

Ex. 2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37,…

A natural number greater than 1 that is not prime is called a
composite number.

Ex. 4, 6, 8, 9, 10, 12,…

EXAMPLE 1

Factoring Numbers

Write 90 as the product of prime factors.

Solution:

Starting with the smallest prime factor is not necessary. No matter
which prime factor is started with the same prime factorization will
always be found.

Objective

Writing fractions in lowest terms.

A fraction is in lowest terms, when the numerator and
denominator have no common factors other than 1.

Basic Principle of Fractions:

If the numerator and denominator are multiplied or
divided by the same nonzero number, the fraction remains
unchanged.

Writing a Fraction in Lowest Terms:

Step 1:
Write the numerator and the denominator as the
product of prime factors.

Step 2:
Divide the numerator and denominator by the
greatest common factor, the product of all
factors common to both.

EXAMPLE 2

Writing Fractions in Lowest
Terms

Write in lowest terms

Solution:

When writing fractions in lowest terms, be sure to
include the factor 1 in the numerator or an error may
result.

Objective

Multiply and divide fractions.

Multiplying Fractions:

If and are fractions, then ,

That is, to multiply two fractions, multiply their numerators
and then multiply their denominators.

Dividing Fractions :

If and are fractions, then .

That is, to divide two fractions, is to multiply its reciprocal;
the fraction flipped upside down.

EXAMPLE 3

Multiplying Fractions

Find each product, and write it in lowest simple terms.